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(Gerschgorins Circle Theorem) Let Abe a complex n n matrix. If is an eigenvalue of A

Linear Algebra: A Geometric Approach | 2nd Edition | ISBN: 9781429215213 | Authors: Ted Shifrin, Malcolm Adams ISBN: 9781429215213 438

Solution for problem 11 Chapter 7.1

Linear Algebra: A Geometric Approach | 2nd Edition

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Linear Algebra: A Geometric Approach | 2nd Edition | ISBN: 9781429215213 | Authors: Ted Shifrin, Malcolm Adams

Linear Algebra: A Geometric Approach | 2nd Edition

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Problem 11

(Gerschgorins Circle Theorem) Let Abe a complex n n matrix. If is an eigenvalue of A, show that lies in at least one of the disks |z aii| j _=I

Step-by-Step Solution:
Step 1 of 3

MATH 2010 - Multivariable Calculus & Matrix Algebra Professor Herron - Rensselaer Polytechnic Institute Week 4 (2/22/16 - 2/26/16) Important: These notes are in no way intended to replace attendance in lecture. For best results in this course, it is imperative that you attend...

Step 2 of 3

Chapter 7.1, Problem 11 is Solved
Step 3 of 3

Textbook: Linear Algebra: A Geometric Approach
Edition: 2
Author: Ted Shifrin, Malcolm Adams
ISBN: 9781429215213

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(Gerschgorins Circle Theorem) Let Abe a complex n n matrix. If is an eigenvalue of A

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